/*
 * $Id$
 */

package edu.jas.gbmod;


import java.io.Serializable;
import java.util.ArrayList;
import java.util.Iterator;
import java.util.List;
import java.util.Map;

import org.apache.log4j.Logger;

import edu.jas.gb.Reduction;
import edu.jas.gb.ReductionSeq;
import edu.jas.gb.SolvableExtendedGB;
import edu.jas.gb.SolvableGroebnerBase;
import edu.jas.gb.SolvableGroebnerBaseSeq;
import edu.jas.gb.SolvableReduction;
import edu.jas.gb.SolvableReductionSeq;
import edu.jas.poly.ExpVector;
import edu.jas.poly.GenPolynomial;
import edu.jas.poly.GenSolvablePolynomial;
import edu.jas.poly.GenSolvablePolynomialRing;
import edu.jas.poly.ModuleList;
import edu.jas.poly.PolynomialList;
import edu.jas.structure.RingElem;
import edu.jas.vector.BasicLinAlg;


/**
 * Syzygy class for solvable polynomials. Implements Syzygy computations and
 * tests.
 * @param <C> coefficient type
 * @author Heinz Kredel
 */

public class SolvableSyzygyAbstract<C extends RingElem<C>> implements SolvableSyzygy<C> {


    private static final Logger logger = Logger.getLogger(SolvableSyzygyAbstract.class);


    private final boolean debug = logger.isDebugEnabled();


    /**
     * Solvable reduction engine.
     */
    protected SolvableReduction<C> sred;


    /**
     * Reduction engine.
     */
    protected Reduction<C> red;


    /**
     * Linear algebra engine.
     */
    protected BasicLinAlg<GenPolynomial<C>> blas;


    /**
     * Constructor.
     */
    public SolvableSyzygyAbstract() {
        red = new ReductionSeq<C>();
        sred = new SolvableReductionSeq<C>();
        blas = new BasicLinAlg<GenPolynomial<C>>();
    }


    /**
     * Left syzygy for left Groebner base.
     * @param F a Groebner base.
     * @return leftSyz(F), a basis for the left module of syzygies for F.
     */
    public List<List<GenSolvablePolynomial<C>>> leftZeroRelations(List<GenSolvablePolynomial<C>> F) {
        return leftZeroRelations(0, F);
    }


    /**
     * Left syzygy for left Groebner base.
     * @param modv number of module variables.
     * @param F a Groebner base.
     * @return leftSyz(F), a basis for the left module of syzygies for F.
     */
    public List<List<GenSolvablePolynomial<C>>> leftZeroRelations(int modv, List<GenSolvablePolynomial<C>> F) {
        List<List<GenSolvablePolynomial<C>>> Z = new ArrayList<List<GenSolvablePolynomial<C>>>();
        ArrayList<GenSolvablePolynomial<C>> S = new ArrayList<GenSolvablePolynomial<C>>(F.size());
        for (int i = 0; i < F.size(); i++) {
            S.add(null);
        }
        GenSolvablePolynomial<C> pi, pj, s, h, zero;
        zero = null;
        for (int i = 0; i < F.size(); i++) {
            pi = F.get(i);
            if (pi != null && zero == null) {
                zero = pi.ring.getZERO();
            }
            for (int j = i + 1; j < F.size(); j++) {
                pj = F.get(j);
                //logger.info("p"+i+", p"+j+" = " + pi + ", " +pj);

                if (!red.moduleCriterion(modv, pi, pj)) {
                    continue;
                }
                // if ( ! red.criterion4( pi, pj ) ) continue;
                ArrayList<GenSolvablePolynomial<C>> row = (ArrayList<GenSolvablePolynomial<C>>) S.clone();

                s = sred.leftSPolynomial(row, i, pi, j, pj);
                //logger.info("row = " + row);
                if (s.isZERO()) {
                    Z.add(row);
                    continue;
                }

                h = sred.leftNormalform(row, F, s);
                if (!h.isZERO()) {
                    throw new ArithmeticException("Syzygy no leftGB");
                }
                if (logger.isDebugEnabled()) {
                    logger.info("row = " + row);
                }
                Z.add(row);
            }
        }
        // set null to zero
        for (List<GenSolvablePolynomial<C>> vr : Z) {
            for (int j = 0; j < vr.size(); j++) {
                if (vr.get(j) == null) {
                    vr.set(j, zero);
                }
            }
        }
        return Z;
    }


    /**
     * Left syzygy for left module Groebner base.
     * @param M a Groebner base.
     * @return leftSyz(M), a basis for the left module of syzygies for M.
     */
    @SuppressWarnings("unchecked")
    public ModuleList<C> leftZeroRelations(ModuleList<C> M) {
        ModuleList<C> N = null;
        if (M == null || M.list == null) {
            return N;
        }
        if (M.rows == 0 || M.cols == 0) {
            return N;
        }
        GenSolvablePolynomial<C> zero = (GenSolvablePolynomial<C>) M.ring.getZERO();
        //logger.info("zero = " + zero);

        //ModuleList<C> Np = null;
        PolynomialList<C> F = M.getPolynomialList();
        int modv = M.cols; // > 0  
        logger.info("modv = " + modv);
        List<List<GenSolvablePolynomial<C>>> G = leftZeroRelations(modv, F.castToSolvableList());
        //if (G == null) {
        //    return N;
        //}
        List<List<GenSolvablePolynomial<C>>> Z = new ArrayList<List<GenSolvablePolynomial<C>>>();
        for (int i = 0; i < G.size(); i++) {
            List<GenSolvablePolynomial<C>> Gi = G.get(i);
            List<GenSolvablePolynomial<C>> Zi = new ArrayList<GenSolvablePolynomial<C>>();
            // System.out.println("\nG("+i+") = " + G.get(i));
            for (int j = 0; j < Gi.size(); j++) {
                //System.out.println("\nG("+i+","+j+") = " + Gi.get(j));
                GenSolvablePolynomial<C> p = Gi.get(j);
                if (p != null) {
                    Map<ExpVector, GenPolynomial<C>> r = p.contract(M.ring);
                    //System.out.println("map("+i+","+j+") = " + r + ", size = " + r.size() );
                    if (r.size() == 0) {
                        Zi.add(zero);
                    } else if (r.size() == 1) {
                        GenSolvablePolynomial<C> vi = (GenSolvablePolynomial<C>) (r.values().toArray())[0];
                        Zi.add(vi);
                    } else { // will not happen
                        throw new RuntimeException("Map.size() > 1 = " + r.size());
                    }
                }
            }
            //System.out.println("\nZ("+i+") = " + Zi);
            Z.add(Zi);
        }
        N = new ModuleList<C>((GenSolvablePolynomialRing<C>) M.ring, Z);
        //System.out.println("\n\nN = " + N);
        return N;
    }


    /**
     * Test if left syzygy.
     * @param Z list of sysygies.
     * @param F a polynomial list.
     * @return true, if Z is a list of left syzygies for F, else false.
     */
    public boolean isLeftZeroRelation(List<List<GenSolvablePolynomial<C>>> Z, List<GenSolvablePolynomial<C>> F) {
        List<GenPolynomial<C>> Fp = PolynomialList.<C> castToList(F);
        for (List<GenSolvablePolynomial<C>> row : Z) {
            // p has wrong type:
            GenPolynomial<C> p = blas.scalarProduct(PolynomialList.<C> castToList(row), Fp);
            if (p == null) {
                continue;
            }
            if (!p.isZERO()) {
                logger.info("is not ZeroRelation = " + p);
                return false;
            }
        }
        return true;
    }


    /**
     * Test if right syzygy.
     * @param Z list of sysygies.
     * @param F a polynomial list.
     * @return true, if Z is a list of right syzygies for F, else false.
     */
    public boolean isRightZeroRelation(List<List<GenSolvablePolynomial<C>>> Z,
                    List<GenSolvablePolynomial<C>> F) {
        List<GenPolynomial<C>> Fp = PolynomialList.<C> castToList(F);
        for (List<GenSolvablePolynomial<C>> row : Z) {
            List<GenPolynomial<C>> yrow = PolynomialList.<C> castToList(row);
            // p has wrong type:
            GenPolynomial<C> p = blas.scalarProduct(Fp, yrow); // param order
            if (p == null) {
                continue;
            }
            if (!p.isZERO()) {
                logger.info("is not ZeroRelation = " + p);
                return false;
            }
        }
        return true;
    }


    /**
     * Test if left sysygy of modules
     * @param Z list of sysygies.
     * @param F a module list.
     * @return true, if Z is a list of left syzygies for F, else false.
     */
    public boolean isLeftZeroRelation(ModuleList<C> Z, ModuleList<C> F) {
        if (Z == null || Z.list == null) {
            return true;
        }
        for (List<GenPolynomial<C>> row : Z.list) {
            List<GenPolynomial<C>> zr = blas.leftScalarProduct(row, F.list);
            if (!blas.isZero(zr)) {
                logger.info("is not ZeroRelation (" + zr.size() + ") = " + zr);
                return false;
            }
        }
        return true;
    }


    /**
     * Test if right sysygy of modules
     * @param Z list of sysygies.
     * @param F a module list.
     * @return true, if Z is a list of right syzygies for F, else false.
     */
    public boolean isRightZeroRelation(ModuleList<C> Z, ModuleList<C> F) {
        if (Z == null || Z.list == null) {
            return true;
        }
        for (List<GenPolynomial<C>> row : Z.list) {
            List<GenPolynomial<C>> zr = blas.rightScalarProduct(row, F.list);
            //List<GenPolynomial<C>> zr = blas.scalarProduct(row,F.list);
            if (!blas.isZero(zr)) {
                logger.info("is not ZeroRelation (" + zr.size() + ") = " + zr);
                return false;
            }
        }
        return true;
    }


    /**
     * Resolution of a module. Only with direct GBs.
     * @param M a module list of a Groebner basis.
     * @return a resolution of M.
     */
    public List<SolvResPart<C>> resolution(ModuleList<C> M) {
        List<SolvResPart<C>> R = new ArrayList<SolvResPart<C>>();
        ModuleList<C> MM = M;
        ModuleList<C> GM;
        ModuleList<C> Z;
        ModSolvableGroebnerBase<C> msbb = new ModSolvableGroebnerBaseAbstract<C>();
        while (true) {
            GM = msbb.leftGB(MM);
            Z = leftZeroRelations(GM);
            R.add(new SolvResPart<C>(MM, GM, Z));
            if (Z == null || Z.list == null || Z.list.size() == 0) {
                break;
            }
            MM = Z;
        }
        return R;
    }


    /**
     * Resolution of a polynomial list. Only with direct GBs.
     * @param F a polynomial list of a Groebner basis.
     * @return a resolution of F.
     */
    @SuppressWarnings("unchecked")
    public List // <SolvResPart<C>|SolvResPolPart<C>> 
      resolution(PolynomialList<C> F) {
        List<List<GenSolvablePolynomial<C>>> Z;
        ModuleList<C> Zm;
        List<GenSolvablePolynomial<C>> G;
        PolynomialList<C> Gl;
        SolvableGroebnerBase<C> sbb = new SolvableGroebnerBaseSeq<C>();

        G = sbb.leftGB(F.castToSolvableList());
        Z = leftZeroRelations(G);
        Gl = new PolynomialList<C>((GenSolvablePolynomialRing<C>) F.ring, G);
        Zm = new ModuleList<C>((GenSolvablePolynomialRing<C>) F.ring, Z);

        List R = resolution(Zm);
        R.add(0, new SolvResPolPart<C>(F, Gl, Zm));
        return R;
    }


    /**
     * Resolution of a module.
     * @param M a module list of an arbitrary basis.
     * @return a resolution of M.
     */
    public List<SolvResPart<C>> resolutionArbitrary(ModuleList<C> M) {
        List<SolvResPart<C>> R = new ArrayList<SolvResPart<C>>();
        ModuleList<C> MM = M;
        ModuleList<C> GM = null;
        ModuleList<C> Z;
        //ModSolvableGroebnerBase<C> msbb = new ModSolvableGroebnerBaseAbstract<C>();
        while (true) {
            //GM = msbb.leftGB(MM);
            Z = leftZeroRelationsArbitrary(MM);
            R.add(new SolvResPart<C>(MM, GM, Z));
            if (Z == null || Z.list == null || Z.list.size() == 0) {
                break;
            }
            MM = Z;
        }
        return R;
    }


    /**
     * Resolution of a polynomial list.
     * @param F a polynomial list of an arbitrary basis.
     * @return a resolution of F.
     */
    @SuppressWarnings("unchecked")
    public List // <SolvResPart<C>|SolvResPolPart<C>> 
      resolutionArbitrary(PolynomialList<C> F) {
        List<List<GenSolvablePolynomial<C>>> Z;
        ModuleList<C> Zm;
        //List<GenSolvablePolynomial<C>> G;
        PolynomialList<C> Gl = null;
        //SolvableGroebnerBase<C> sbb = new SolvableGroebnerBaseSeq<C>();

        //G = sbb.leftGB( F.castToSolvableList() );
        Z = leftZeroRelationsArbitrary(F.castToSolvableList());
        //Gl = new PolynomialList<C>((GenSolvablePolynomialRing<C>)F.ring, G);
        Zm = new ModuleList<C>((GenSolvablePolynomialRing<C>) F.ring, Z);

        List R = resolutionArbitrary(Zm);
        R.add(0, new SolvResPolPart<C>(F, Gl, Zm));
        return R;
    }


    /**
     * Left syzygy module from arbitrary base.
     * @param F a solvable polynomial list.
     * @return syz(F), a basis for the module of left syzygies for F.
     */
    public List<List<GenSolvablePolynomial<C>>> leftZeroRelationsArbitrary(List<GenSolvablePolynomial<C>> F) {
        return leftZeroRelationsArbitrary(0, F);
    }


    /**
     * Left syzygy module from arbitrary base.
     * @param modv number of module variables.
     * @param F a solvable polynomial list.
     * @return syz(F), a basis for the module of left syzygies for F.
     */
     @SuppressWarnings("unchecked")
     public List<List<GenSolvablePolynomial<C>>> leftZeroRelationsArbitrary(int modv,
                    List<GenSolvablePolynomial<C>> F) {
        if (F == null) {
            return null; //leftZeroRelations( modv, F );
        }
        if (F.size() <= 1) {
            return leftZeroRelations(modv, F);
        }
        final int lenf = F.size();
        SolvableGroebnerBaseSeq<C> sgb = new SolvableGroebnerBaseSeq<C>();
        SolvableExtendedGB<C> exgb = sgb.extLeftGB(F);
        if (debug) {
            logger.info("exgb = " + exgb);
        }
        if (!sgb.isLeftReductionMatrix(exgb)) {
            logger.error("is reduction matrix ? false");
        }
        List<GenSolvablePolynomial<C>> G = exgb.G;
        List<List<GenSolvablePolynomial<C>>> G2F = exgb.G2F;
        List<List<GenSolvablePolynomial<C>>> F2G = exgb.F2G;

        List<List<GenSolvablePolynomial<C>>> sg = leftZeroRelations(modv, G);
        GenSolvablePolynomialRing<C> ring = G.get(0).ring;
        ModuleList<C> S = new ModuleList<C>(ring, sg);
        if (debug) {
            logger.info("syz = " + S);
        }
        if (!isLeftZeroRelation(sg, G)) {
            logger.error("is syzygy ? false");
        }

        List<List<GenSolvablePolynomial<C>>> sf;
        sf = new ArrayList<List<GenSolvablePolynomial<C>>>(sg.size());
        //List<GenPolynomial<C>> row;

        for (List<GenSolvablePolynomial<C>> r : sg) {
            Iterator<GenSolvablePolynomial<C>> it = r.iterator();
            Iterator<List<GenSolvablePolynomial<C>>> jt = G2F.iterator();

            List<GenSolvablePolynomial<C>> rf;
            rf = new ArrayList<GenSolvablePolynomial<C>>(lenf);
            for (int m = 0; m < lenf; m++) {
                rf.add(ring.getZERO());
            }
            while (it.hasNext() && jt.hasNext()) {
                GenSolvablePolynomial<C> si = it.next();
                List<GenSolvablePolynomial<C>> ai = jt.next();
                //System.out.println("si = " + si);
                //System.out.println("ai = " + ai);
                if (si == null || ai == null) {
                    continue;
                }
                // pi has wrong type:
                List<GenPolynomial<C>> pi = blas.scalarProduct(si, PolynomialList.<C> castToList(ai));
                //System.out.println("pi = " + pi);
                rf = PolynomialList.<C> castToSolvableList(blas.vectorAdd(PolynomialList.<C> castToList(rf),
                                pi));
            }
            if (it.hasNext() || jt.hasNext()) {
                logger.error("leftZeroRelationsArbitrary wrong sizes");
            }
            //System.out.println("\nrf = " + rf + "\n");
            sf.add(rf);
        }
        if (!isLeftZeroRelation(sf, F)) {
            logger.error("is partial syz sf ? false");
        }

        List<List<GenSolvablePolynomial<C>>> M;
        M = new ArrayList<List<GenSolvablePolynomial<C>>>(lenf);
        for (List<GenSolvablePolynomial<C>> r : F2G) {
            Iterator<GenSolvablePolynomial<C>> it = r.iterator();
            Iterator<List<GenSolvablePolynomial<C>>> jt = G2F.iterator();

            List<GenSolvablePolynomial<C>> rf;
            rf = new ArrayList<GenSolvablePolynomial<C>>(lenf);
            for (int m = 0; m < lenf; m++) {
                rf.add(ring.getZERO());
            }
            while (it.hasNext() && jt.hasNext()) {
                GenSolvablePolynomial<C> si = it.next();
                List<GenSolvablePolynomial<C>> ai = jt.next();
                //System.out.println("si = " + si);
                //System.out.println("ai = " + ai);
                if (si == null || ai == null) {
                    continue;
                }
                //pi has wrong type, should be: List<GenSolvablePolynomial<C>>
                List<GenPolynomial<C>> pi = blas.scalarProduct(si, PolynomialList.<C> castToList(ai));
                //System.out.println("pi = " + pi);
                rf = PolynomialList.<C> castToSolvableList(blas.vectorAdd(PolynomialList.<C> castToList(rf),
                                pi));
            }
            if (it.hasNext() || jt.hasNext()) {
                logger.error("zeroRelationsArbitrary wrong sizes");
            }
            //System.out.println("\nMg Mf = " + rf + "\n");
            M.add(rf);
        }
        //ModuleList<C> ML = new ModuleList<C>( ring, M );
        //System.out.println("syz ML = " + ML);
        // debug only:
        //List<GenSolvablePolynomial<C>> F2 = new ArrayList<GenSolvablePolynomial<C>>( F.size() );
        /* not true in general
        List<GenPolynomial<C>> Fp = PolynomialList.<C>castToList(F);
        for ( List<GenSolvablePolynomial<C>> rr: M ) {
            GenSolvablePolynomial<C> rrg = PolynomialList.<C>castToSolvableList(blas.scalarProduct(Fp,PolynomialList.<C>castToList(rr)));
            F2.add( rrg );
        }
        PolynomialList<C> pF = new PolynomialList<C>( ring, F );
        PolynomialList<C> pF2 = new PolynomialList<C>( ring, F2 );
        if ( ! pF.equals( pF2 ) ) {
           logger.error("is FAB = F ? false");
           //System.out.println("pF  = " + pF.list.size());
           //System.out.println("pF2 = " + pF2.list.size());
        }
        */
        int sflen = sf.size();
        List<List<GenSolvablePolynomial<C>>> M2;
        M2 = new ArrayList<List<GenSolvablePolynomial<C>>>(lenf);
        int i = 0;
        for (List<GenSolvablePolynomial<C>> ri : M) {
            List<GenSolvablePolynomial<C>> r2i;
            r2i = new ArrayList<GenSolvablePolynomial<C>>(ri.size());
            int j = 0;
            for (GenSolvablePolynomial<C> rij : ri) {
                GenSolvablePolynomial<C> p = null;
                if (i == j) {
                    p = (GenSolvablePolynomial<C>) ring.getONE().subtract(rij);
                } else {
                    if (rij != null) {
                        p = (GenSolvablePolynomial<C>) rij.negate();
                    }
                }
                r2i.add(p);
                j++;
            }
            M2.add(r2i);
            if (!blas.isZero(PolynomialList.<C> castToList(r2i))) {
                sf.add(r2i);
            }
            i++;
        }
        ModuleList<C> M2L = new ModuleList<C>(ring, M2);
        if (debug) {
            logger.debug("syz M2L = " + M2L);
        }

        if (debug) {
            ModuleList<C> SF = new ModuleList<C>(ring, sf);
            logger.debug("syz sf = " + SF);
            logger.debug("#syz " + sflen + ", " + sf.size());
        }
        if (!isLeftZeroRelation(sf, F)) {
            logger.error("is syz sf ? false");
        }
        return sf;
    }


    /**
     * Left syzygy for arbitrary left module base.
     * @param M an arbitrary base.
     * @return leftSyz(M), a basis for the left module of syzygies for M.
     */
    @SuppressWarnings("unchecked")
    public ModuleList<C> leftZeroRelationsArbitrary(ModuleList<C> M) {
        ModuleList<C> N = null;
        if (M == null || M.list == null) {
            return N;
        }
        if (M.rows == 0 || M.cols == 0) {
            return N;
        }
        GenSolvablePolynomial<C> zero = (GenSolvablePolynomial<C>) M.ring.getZERO();
        //logger.info("zero = " + zero);

        //ModuleList<C> Np = null;
        PolynomialList<C> F = M.getPolynomialList();
        int modv = M.cols; // > 0  
        logger.info("modv = " + modv);
        List<List<GenSolvablePolynomial<C>>> G = leftZeroRelationsArbitrary(modv, F.castToSolvableList());
        if (G == null) {
            return N;
        }
        List<List<GenSolvablePolynomial<C>>> Z = new ArrayList<List<GenSolvablePolynomial<C>>>();
        for (int i = 0; i < G.size(); i++) {
            List<GenSolvablePolynomial<C>> Gi = G.get(i);
            List<GenSolvablePolynomial<C>> Zi = new ArrayList<GenSolvablePolynomial<C>>();
            // System.out.println("\nG("+i+") = " + G.get(i));
            for (int j = 0; j < Gi.size(); j++) {
                //System.out.println("\nG("+i+","+j+") = " + Gi.get(j));
                GenSolvablePolynomial<C> p = Gi.get(j);
                if (p != null) {
                    Map<ExpVector, GenPolynomial<C>> r = p.contract(M.ring);
                    //System.out.println("map("+i+","+j+") = " + r + ", size = " + r.size() );
                    if (r.size() == 0) {
                        Zi.add(zero);
                    } else if (r.size() == 1) {
                        GenSolvablePolynomial<C> vi = (GenSolvablePolynomial<C>) (r.values().toArray())[0];
                        Zi.add(vi);
                    } else { // will not happen
                        throw new RuntimeException("Map.size() > 1 = " + r.size());
                    }
                }
            }
            //System.out.println("\nZ("+i+") = " + Zi);
            Z.add(Zi);
        }
        N = new ModuleList<C>((GenSolvablePolynomialRing<C>) M.ring, Z);
        //System.out.println("\n\nN = " + N);
        return N;
    }


    /**
     * Right syzygy module from arbitrary base.
     * @param F a solvable polynomial list.
     * @return syz(F), a basis for the module of right syzygies for F.
     */
    public List<List<GenSolvablePolynomial<C>>> rightZeroRelationsArbitrary(List<GenSolvablePolynomial<C>> F) {
        return rightZeroRelationsArbitrary(0, F);
    }


    /**
     * Right syzygy module from arbitrary base.
     * @param modv number of module variables.
     * @param F a solvable polynomial list.
     * @return syz(F), a basis for the module of right syzygies for F.
     */
    @SuppressWarnings("unchecked")
    public List<List<GenSolvablePolynomial<C>>> rightZeroRelationsArbitrary(int modv,
                    List<GenSolvablePolynomial<C>> F) {
        GenSolvablePolynomialRing<C> ring = null;
        for (GenSolvablePolynomial<C> p : F) {
            if (p != null) {
                ring = p.ring;
                break;
            }
        }
        List<List<GenSolvablePolynomial<C>>> Z;
        if (ring == null) { // all null
            Z = new ArrayList<List<GenSolvablePolynomial<C>>>(1);
            Z.add(F);
            return Z;
        }
        GenSolvablePolynomialRing<C> rring = ring.reverse(true);
        GenSolvablePolynomial<C> q;
        List<GenSolvablePolynomial<C>> rF;
        rF = new ArrayList<GenSolvablePolynomial<C>>(F.size());
        for (GenSolvablePolynomial<C> p : F) {
            if (p != null) {
                q = (GenSolvablePolynomial<C>) p.reverse(rring);
                rF.add(q);
            }
        }
        if (logger.isInfoEnabled()) {
            PolynomialList<C> pl = new PolynomialList<C>(rring, rF);
            logger.info("reversed problem = " + pl);
            //System.out.println("reversed problem = " + pl);
        }
        List<List<GenSolvablePolynomial<C>>> rZ = leftZeroRelationsArbitrary(modv, rF);
        if (debug) {
            boolean isit = isLeftZeroRelation(rZ, rF);
            logger.debug("isLeftZeroRelation = " + isit);
        }
        GenSolvablePolynomialRing<C> oring = rring.reverse(true);
        if (debug) {
            logger.debug("ring == oring: " + ring.equals(oring));
        }
        ring = oring;
        Z = new ArrayList<List<GenSolvablePolynomial<C>>>(rZ.size());
        for (List<GenSolvablePolynomial<C>> z : rZ) {
            if (z == null) {
                continue;
            }
            List<GenSolvablePolynomial<C>> s;
            s = new ArrayList<GenSolvablePolynomial<C>>(z.size());
            for (GenSolvablePolynomial<C> p : z) {
                if (p != null) {
                    q = (GenSolvablePolynomial<C>) p.reverse(ring);
                    s.add(q);
                }
            }
            Z.add(s);
        }
        return Z;
    }

}


/**
 * Container for module resolution components.
 * @param <C> coefficient type
 */
class SolvResPart<C extends RingElem<C>> implements Serializable {


    public final ModuleList<C> module;


    public final ModuleList<C> GB;


    public final ModuleList<C> syzygy;


    /**
     * SolvResPart.
     * @param m a module list.
     * @param g a module list GB.
     * @param z a syzygy module list.
     */
    public SolvResPart(ModuleList<C> m, ModuleList<C> g, ModuleList<C> z) {
        module = m;
        GB = g;
        syzygy = z;
    }


    /**
     * toString.
     */
    @Override
    public String toString() {
        StringBuffer s = new StringBuffer("SolvResPart(\n");
        s.append("module = " + module);
        s.append("\n GB = " + GB);
        s.append("\n syzygy = " + syzygy);
        s.append(")");
        return s.toString();
    }
}


/**
 * Container for polynomial resolution components.
 * @param <C> coefficient type
 */
class SolvResPolPart<C extends RingElem<C>> implements Serializable {


    public final PolynomialList<C> ideal;


    public final PolynomialList<C> GB;


    public final ModuleList<C> syzygy;


    /**
     * SolvResPolPart.
     * @param m a polynomial list.
     * @param g a polynomial list GB.
     * @param z a syzygy module list.
     */
    public SolvResPolPart(PolynomialList<C> m, PolynomialList<C> g, ModuleList<C> z) {
        ideal = m;
        GB = g;
        syzygy = z;
    }


    /**
     * toString.
     */
    @Override
    public String toString() {
        StringBuffer s = new StringBuffer("SolvResPolPart(\n");
        s.append("ideal = " + ideal);
        s.append("\n GB = " + GB);
        s.append("\n syzygy = " + syzygy);
        s.append(")");
        return s.toString();
    }

}
